0000000000774705

AUTHOR

E. Ponsoda

showing 1 related works from this author

Computing continuous numerical solutions of matrix differential equations

1995

Abstract In this paper, we construct analytical approximate solutions of initial value problems for the matrix differential equation X ′( t ) = A ( t ) X ( t ) + X ( t ) B ( t ) + L ( t ), with twice continuously differentiable functions A ( t ), B ( t ), and L ( t ), continuous. We determine, in terms of the data, the existence interval of the problem. Given an admissible error e, we construct an approximate solution whose error is smaller than e uniformly, in all the domain.

Matrix differential equationDifferential equationNumerical solutionSpline functionMathematical analysisMinimax approximation algorithmComputational MathematicsSpline (mathematics)Matrix (mathematics)Initial value problemComputational Theory and MathematicsModelling and SimulationMatrix differential equationModeling and SimulationError boundInitial value problemApproximate solutionLinear equationMathematicsComputers & Mathematics with Applications
researchProduct